In abstract algebra, localization is a systematic method of adding multiplicative inverses to a ring. Given a ring R and a subset S, one wants to construct some ring R* and ring homomorphism from R to R*, such that the image of S consists of units (invertible elements) in R*. Further one wants R* to be the 'best possible' or 'most general' way to do this – in the usual fashion this should be expressed by a universal property. The localization of R by S is often denoted by S −1R, or by RI if S is the complement of a prime ideal I.
An important related process is completion: one often localizes a ring, then completes.
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Another way to describe the localization of a ring R at a subset S is via category theory. If R is a ring and S is a subset, consider the set of all R-algebras A, so that, under the canonical homomorphism R → A, every element of S is mapped to a unit. The elements of this set form the objects of a category, with R-algebra homomorphisms as morphisms. Then, the localization of R at S is the initial object of this category.
The term localization originates in algebraic geometry: if R is a ring of functions defined on some geometric object (algebraic variety) V, and one wants to study this variety "locally" near a point p, then one considers the set S of all functions which are not zero at p and localizes R with respect to S. The resulting ring R* contains only information about the behavior of V near p. Cf. the example given at local ring.
In number theory and algebraic topology, one refers to the behavior of a ring or space at a number n or away from n. "Away from n" means "in a ring where n is invertible" (so a Z[1/n]-algebra). For instance, for a field, "away from p" means "characteristic not equal to p". Z[1/2] is "away from 2", but F2 or Z are not.
Since the product of units is a unit and since ring homomorphisms respect products, we may and will assume that S is a submonoid of the multiplicative monoid of R, i.e. 1 is in S and for s and t in S we also have st in S. A subset of R with this property is called a multiplicative set.
In case R is an integral domain there is an easy construction of the localization. Since the only ring in which 0 is a unit is the trivial ring {0}, the localization R* is {0} if 0 is in S. Otherwise, the field of fractions K of R can be used: we take R* to be the subring of K consisting of the elements of the form r⁄s with r in R and s in S. In this case the homomorphism from R to R* is the standard embedding and is injective: but that will not be the case in general. For example, the dyadic fractions are the localization of the ring of integers with respect to the set of powers of 2. In this case, R* is the dyadic fractions, R is the integers, S is the powers of 2, and the natural map from R to R* is injective.
For general commutative rings, we don't have a field of fractions. Nevertheless, a localization can be constructed consisting of "fractions" with denominators coming from S; in contrast with the integral domain case, one can safely 'cancel' from numerator and denominator only elements of S.
This construction proceeds as follows: on R × S define an equivalence relation ~ by setting (r1,s1) ~ (r2,s2) iff there exists t in S such that
(The presence of t is crucial to the transitivity of ~)
We think of the equivalence class of (r,s) as the "fraction" r⁄s and, using this intuition, the set of equivalence classes R* can be turned into a ring with operations that look identical to those of elementary algebra: a/s+b/t=(at+bs)/st and (a/s)(b/t)=ab/st. The map j : R → R* which maps r to the equivalence class of (r,1) is then a ring homomorphism. (In general, this is not injective; if two elements of R differ by a zero divisor with an annihilator in S, their images under j are equal.)
The above mentioned universal property is the following: the ring homomorphism j : R → R* maps every element of S to a unit in R*, and if f : R → T is some other ring homomorphism which maps every element of S to a unit in T, then there exists a unique ring homomorphism g : R* → T such that f = g ∘ j.
Some properties of the localization R* = S −1R:
Two classes of localizations occur commonly in commutative algebra and algebraic geometry and are used to construct the rings of functions on open subsets in Zariski topology of the spectrum of a ring, Spec(R).
Localizing non-commutative rings is more difficult; the localization does not exist for every set S of prospective units. One condition which ensures that the localization exists is the Ore condition.
One case for non-commutative rings where localization has a clear interest is for rings of differential operators. It has the interpretation, for example, of adjoining a formal inverse D−1 for a differentiation operator D. This is done in many contexts in methods for differential equations. There is now a large mathematical theory about it, named microlocalization, connecting with numerous other branches. The micro- tag is to do with connections with Fourier theory, in particular.
Category:Localization (mathematics)